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- Borel_summation abstract "In mathematics, Borel summation is a summation method for divergent series, introduced by Émile Borel (1899). It is particularly useful for summing divergent asymptotic series, and in some sense gives the best possible sum for such series. There are several variations of this method that are also called Borel summation, and a generalization of it called Mittag-Leffler summation.".
- Borel_summation wikiPageExternalLink item?id=ASENS_1899_3_16__9_0.
- Borel_summation wikiPageExternalLink books?isbn=0821826492.
- Borel_summation wikiPageID "2357705".
- Borel_summation wikiPageLength "20485".
- Borel_summation wikiPageOutDegree "40".
- Borel_summation wikiPageRevisionID "682110793".
- Borel_summation wikiPageWikiLink Abelian_and_tauberian_theorems.
- Borel_summation wikiPageWikiLink Abels_theorem.
- Borel_summation wikiPageWikiLink Abel–Plana_formula.
- Borel_summation wikiPageWikiLink Analytic_continuation.
- Borel_summation wikiPageWikiLink Analytic_function.
- Borel_summation wikiPageWikiLink Asymptotic_expansion.
- Borel_summation wikiPageWikiLink Cambridge_University_Press.
- Borel_summation wikiPageWikiLink Category:Mathematical_series.
- Borel_summation wikiPageWikiLink Category:Quantum_chromodynamics.
- Borel_summation wikiPageWikiLink Category:Summability_methods.
- Borel_summation wikiPageWikiLink Cesàro_summation.
- Borel_summation wikiPageWikiLink Direct_comparison_test.
- Borel_summation wikiPageWikiLink Divergent_series.
- Borel_summation wikiPageWikiLink Euler_summation.
- Borel_summation wikiPageWikiLink Fresnel_integral.
- Borel_summation wikiPageWikiLink Geometric_series.
- Borel_summation wikiPageWikiLink Gösta_Mittag-Leffler.
- Borel_summation wikiPageWikiLink Incomplete_gamma_function.
- Borel_summation wikiPageWikiLink Instanton.
- Borel_summation wikiPageWikiLink Karl_Weierstrass.
- Borel_summation wikiPageWikiLink Lambert_summation.
- Borel_summation wikiPageWikiLink Lars_Edvard_Phragmén.
- Borel_summation wikiPageWikiLink Mark_Kac.
- Borel_summation wikiPageWikiLink Mittag-Leffler_summation.
- Borel_summation wikiPageWikiLink Nachbins_theorem.
- Borel_summation wikiPageWikiLink Perturbation_theory_(quantum_mechanics).
- Borel_summation wikiPageWikiLink Positive_real_numbers.
- Borel_summation wikiPageWikiLink Regular_polygon.
- Borel_summation wikiPageWikiLink Renormalon.
- Borel_summation wikiPageWikiLink Springer_Science+Business_Media.
- Borel_summation wikiPageWikiLink Star_domain.
- Borel_summation wikiPageWikiLink Van_Wijngaarden_transformation.
- Borel_summation wikiPageWikiLink Émile_Borel.
- Borel_summation wikiPageWikiLinkText "Borel resummation".
- Borel_summation wikiPageWikiLinkText "Borel sum".
- Borel_summation wikiPageWikiLinkText "Borel summable".
- Borel_summation wikiPageWikiLinkText "Borel summation".
- Borel_summation wikiPageWikiLinkText "Borel transform".
- Borel_summation wikiPageWikiLinkText "summation".
- Borel_summation align "right".
- Borel_summation authorlink "Émile Borel".
- Borel_summation first "A. A.".
- Borel_summation first "Émile".
- Borel_summation id "B/b017170".
- Borel_summation last "Borel".
- Borel_summation last "Zakharov".
- Borel_summation quote "Borel, then an unknown young man, discovered that his summation method gave the 'right' answer for many classical divergent series. He decided to make a pilgrimage to Stockholm to see Mittag-Leffler, who was the recognized lord of complex analysis. Mittag-Leffler listened politely to what Borel had to say and then, placing his hand upon the complete works by Weierstrass, his teacher, he said in Latin, 'The Master forbids it'.".
- Borel_summation source "Mark Kac, quoted by".
- Borel_summation title "Borel summation method".
- Borel_summation width "33.0".
- Borel_summation wikiPageUsesTemplate Template:Citation.
- Borel_summation wikiPageUsesTemplate Template:Eom.
- Borel_summation wikiPageUsesTemplate Template:Harv.
- Borel_summation wikiPageUsesTemplate Template:Harvs.
- Borel_summation wikiPageUsesTemplate Template:Harvtxt.
- Borel_summation wikiPageUsesTemplate Template:Quote_box.
- Borel_summation year "1899".
- Borel_summation subject Category:Mathematical_series.
- Borel_summation subject Category:Quantum_chromodynamics.
- Borel_summation subject Category:Summability_methods.
- Borel_summation hypernym Method.
- Borel_summation type Software.
- Borel_summation type Chromodynamic.
- Borel_summation type Method.
- Borel_summation type Physic.
- Borel_summation comment "In mathematics, Borel summation is a summation method for divergent series, introduced by Émile Borel (1899). It is particularly useful for summing divergent asymptotic series, and in some sense gives the best possible sum for such series. There are several variations of this method that are also called Borel summation, and a generalization of it called Mittag-Leffler summation.".
- Borel_summation label "Borel summation".
- Borel_summation sameAs Q2329388.
- Borel_summation sameAs Borel_cəmi.
- Borel_summation sameAs Sumatori_de_Borel.
- Borel_summation sameAs Sumado_de_Borel.
- Borel_summation sameAs Sumación_de_Borel.
- Borel_summation sameAs Sommation_de_Borel.
- Borel_summation sameAs बोरल_संकलन.
- Borel_summation sameAs Somma_di_Borel.
- Borel_summation sameAs 보렐_합.
- Borel_summation sameAs Soma_de_Borel.
- Borel_summation sameAs m.0767zw.
- Borel_summation sameAs Сходимость_по_Борелю.
- Borel_summation sameAs Borel_toplamı.
- Borel_summation sameAs Збіжність_за_Борелем.
- Borel_summation sameAs Q2329388.
- Borel_summation sameAs 博雷爾求和.
- Borel_summation wasDerivedFrom Borel_summation?oldid=682110793.
- Borel_summation isPrimaryTopicOf Borel_summation.